We develop a new approach to the representation theory of quantum algebras supporting a torus action via methods from the theory of finite-state automata and algebraic combinatories. We show that for a fixed number in, the torus-invariant primitive ideals in m x n quantum matrices can be seen as a regular language in a natural way. Using this description and a semigroup approach to the set of Cauchon diagrams, a combinatorial object that parameterizes the primes that are torus-invariant, we show that for m fixed, the number P(m, n) of torus-invariant primitive ideals in m x n quantum matrices satisfies a linear recurrence in n over the rational numbers. In the 3 x n case we give a concrete description of the torus-invariant primitive ideals...
Abstract. We quantify the representational power of matrix product states (MPS) for entangled qubit ...
Let K be a field and q be a nonzero element of K that is not a root of unity. We give a criterion fo...
AbstractWe take a graph theoretic approach to the problem of finding generators for those prime idea...
AbstractWe develop a new approach to the representation theory of quantum algebras supporting a toru...
In this paper, we study the primitive ideals of quantum algebras supporting a rational torus action....
Herein we study the prime ideals in the algebra of quantum matrices. The main content of this work i...
AbstractWe describe an algebra for composing automata which includes both classical and quantum enti...
Among several tools used in studying representations of quantum groups (or quantum algebras) are the...
Abstract. We quantify the representational power of matrix product states (MPS) for entangled qubit ...
The computational model of Quantum Finite Automata has been introduced by multiple authors (e.g. [38...
We study the topology of the prime spectrum of an algebra supporting a rational torus action. More p...
(eng) We show that several problems which are known to be undecidable for probabilistic automata bec...
The spin--network quantum simulator model, which essentially encodes the (quantum deformed) SU(2) Ra...
AbstractWe show that several problems which are known to be undecidable for probabilistic automata b...
We show that several problems which are known to be undecidable for probabilistic automata become de...
Abstract. We quantify the representational power of matrix product states (MPS) for entangled qubit ...
Let K be a field and q be a nonzero element of K that is not a root of unity. We give a criterion fo...
AbstractWe take a graph theoretic approach to the problem of finding generators for those prime idea...
AbstractWe develop a new approach to the representation theory of quantum algebras supporting a toru...
In this paper, we study the primitive ideals of quantum algebras supporting a rational torus action....
Herein we study the prime ideals in the algebra of quantum matrices. The main content of this work i...
AbstractWe describe an algebra for composing automata which includes both classical and quantum enti...
Among several tools used in studying representations of quantum groups (or quantum algebras) are the...
Abstract. We quantify the representational power of matrix product states (MPS) for entangled qubit ...
The computational model of Quantum Finite Automata has been introduced by multiple authors (e.g. [38...
We study the topology of the prime spectrum of an algebra supporting a rational torus action. More p...
(eng) We show that several problems which are known to be undecidable for probabilistic automata bec...
The spin--network quantum simulator model, which essentially encodes the (quantum deformed) SU(2) Ra...
AbstractWe show that several problems which are known to be undecidable for probabilistic automata b...
We show that several problems which are known to be undecidable for probabilistic automata become de...
Abstract. We quantify the representational power of matrix product states (MPS) for entangled qubit ...
Let K be a field and q be a nonzero element of K that is not a root of unity. We give a criterion fo...
AbstractWe take a graph theoretic approach to the problem of finding generators for those prime idea...